A New Factor from E6-Mod to E7-Mod

Abstract

We find a new representation of the simple Lie algebra of type E7 on the polynomial algebra in 27 variables, which gives a fractional representation of the corresponding Lie group on 27-dimensional space. Using this representation and Shen's idea of mixed product, we construct a functor from E6- Mod to E7- Mod. A condition for the functor to map a finite-dimensional irreducible E6-module to an infinite-dimensional irreducible E7-module is obtained. Our general frame also gives a direct polynomial extension from irreducible E6-modules to irreducible E7-modules. The obtained infinite-dimensional irreducible E7-modules are ( G,K)-modules in terms of Lie group representations. The results could be used in studying the quantum field theory with E7 symmetry and symmetry of partial differential equations.